Minimal mass blow-up solutions for a inhomogeneous NLS equation
Abstract
We consider the inhomogeneous nonlinear Schr\"odinger (INLS) equation in RN aligninls i ∂t u + u +V(x)|u|4-2bNu = 0, align where V(x) = k(x)|x|-b, with b>0. Under suitable assumptions on k(x), we established the threshold for global existence and blow-up and then study the existence and non-existence of minimal mass blow-up solutions.
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